THE NATURAL EXPONENTIAL FUNCTION

Recall that by definition, an exponential function
is of the form $\,f(x) = b^x\,$,
where $\,b\,$ is a positive number not equal to $\,1\,$.

Inside the class of exponential functions (one member for each allowable value of the base $\,b\,$)
there is a particular member that is singled out as being most important.

Why?

It has a simple property (discussed in a future section) that usually makes it easier to work with than any other member of its class.

This special member has base $\,\text{e}\,$, and is called the natural exponential function.
The natural exponential function is so important that if you hear someone say ‘the exponential function’ (as opposed to ‘an exponential function’),
then they're talking about $\,f(x) = \text{e}^x\,$.

This most important member of its class is shown in red below:

The Irrational Number $\,\text{e}\,$

It might be curious to you that the proclaimed ‘simplest’ exponential function
has such an ‘unusual’ base.
You might wondershouldn't a simple base
like $\,2\,$ or $\,3\,$ be better?
So, let's begin by studying this special basethe irrational number $\,\text{e}\,$.

A REVIEW OF IRRATIONAL NUMBERS

Recall first that a number is called ‘rational’
when it can be expressed as a ratio (a fraction) of integers.
The integers are this collection: $\,\{\ldots,-3\,-2,-1,0,1,2,3,\ldots \}$
For example, $\,-\frac{2}{5} = \frac{-2}{5}\,$ and $\,7 = \frac{7}{1} = \frac{14}{2}\,$ are rational numbers.
The word ‘rational’ comes from the ‘ratio’ part of the definition.

Irrational numbers are, by definition, not rational.
(The prefix ‘ir’ denotes ‘not’,
as in the words irreverent, irreducible, and irreversible.)
That is, irrational numbers cannot
be expressed as a ratio of integers.

Every irrational number has a decimal representation as an infinite, non-repeating decimal.
That is, the decimal representation goes on forever, and you never reach a sequence of digits that repeats itself ad infinitum.

Soirrational numbers don't have ‘nice’ names, like:

$\,\frac{2}{3}\,$ (a ratio of integers)

$\,3.72\,$ (a finite decimal)

$\,2.3\overline{45}\,$ (an infinite repeating decimal)

Two very important irrational numbers are given special letter names:

$\,\text{e}\,$ ($\,\text{e}\approx 2.72\,$)

$\,\pi\,$ (the ratio of circumference to diameter
in any circle; $\,\pi\approx 3.14\,$)

Need more decimal places of accuracy?
Jump up to WolframAlpha and type in math constant e
or pi .

There's a definition of the irrational number $\,\text{e}\,$ that is particularly important in our context.
This definition involves looking at the expression $\left(1 + \frac 1n\right)^n$ for large positive values of $\,n\,$.
An exploration of this expression is also a good example of where intuition can fail you in mathematics!

Consider the expression $\,\left( 1 + \frac 1n\right)^n\,$ for bigger and bigger positive integer
values of $\,n\,$.
When I ask students what number they think this ‘looks like’ for such values of $\,n\,$,
I often get the answer: ‘$\,1\,$’.

We can get the numbers $\,\left(1 + \frac 1n\right)^n\,$ as close to $\,\text{e}\,$
as desired,
by making $\,n\,$ sufficiently large.

THE FLAW IN THE PRIOR ARGUMENT

In the prior argument, we let the value of $\,n\,$ inside the parentheses go to infinity first,
and then we let the exponent go to infinity.
However, when evaluating limits, you must let every occurrence of $\,n\,$ go to infinity at the same time!

The Graph of the Natural Exponential Function

Here are graphs of the natural exponential function, together with two nearby functions:

$\color{blue}{y = 2^x}\,$ is in blue

$\color{red}{y = {\text{e}}^x}\,$, the natural exponential function, is in red